In this paper we present a class of regime switching diffusion models
described by a pair (X(t),Y(t)) ∈ Rn × S, S = {1, 2, . . . , N}, Y(t) being a Markov
chain, for which the marginal probability of the diffusive component X(t) is a given
mixture. Our main motivation is to extend to a multivariate setting the class of
mixture models proposed by Brigo and Mercurio in a series of papers. Furthermore,
a simple algorithm is available for simulating paths through a thinning mechanism.
The application to option pricing is considered by proposing a mixture version for
theMargrabe Option formula and the Heston stochastic volatility formula for a plain
vanilla